Multivariate Statistical Analysis
|
|
- Merryl McCormick
- 5 years ago
- Views:
Transcription
1 Multivariate Statistical Analysis Fall 2011 C. L. Williams, Ph.D. Lecture 9 for Applied Multivariate Analysis
2 Outline Two sample T 2 test 1 Two sample T 2 test 2
3 Analogous to the univariate context, we wish to determine whether the mean vectors are comparable, more formally: H 0 : µ 1 = µ 2 (1) Suppose we let y 1i, i = 1,... n 1 and y 2i, i = 1,... n 2 represent independent samples from two p-variate normal distribution with mean vectors µ 1 and µ 2 but with common covariance matrix Σ unknown, provided Σ is positive definite and n > p, given sample estimators for mean and covariance ȳ and S respectively.
4 We can then define W 1 = (n 1 1)S 1 = W 2 = (n 2 1)S 2 = n 1 i=1 n 2 (y 1i ȳ 1 )(y 1i ȳ 1 ) (y 2i ȳ 2 )(y 2i ȳ 2 ) i=1 since each are unbiased estimators of the common covariance matrix, ie. E[(n 1 1)S 1 ] = (n 1 1)Σ and E[(n 2 1)S 2 ] = (n 2 1)Σ
5 The T 2 statistic can be calculated as: ( )( ) T 2 n1 n 2 n1 n 2 = (ȳ 1 ȳ 2 ) S 1 (ȳ 1 ȳ 2 ) (2) n 1 + n 2 n 1 + n 2 where S 1 is the inverse of the pooled correlation matrix given by: S = (n 1 1)S 1 + (n 2 1)S 2 n 1 + n = n 1 + n 2 2 (W 1 + W 2 ) given the sample estimates for covariance, S 1 and S 2 in the two samples.
6 Outline Two sample T 2 test 1 Two sample T 2 test 2
7 Again, there is a simple relationship between the test statistic, T 2, and the F distribution: Theorem If y 1i, i = 1,... n 1 and y 2i, i = 1,... n 2 represent independent samples from two p variate normal distribution with mean vectors µ 1 and µ 2 but with common covariance matrix Σ, provided Σ is positive definite and n > p, given sample estimators for mean and covariance ȳ and S respectively, then: F = (n 1 + n 2 p 1)T 2 (n 1 + n 2 2)p has an F distribution on p and (n 1 + n 2 p 1) degrees of freedom.
8 Essentially, we compute the test statistic, and see whether it falls within the (1 α) quantile of the F distribution on those degrees of freedom. Note again that to ensure non-singularity of S, we require that n 1 + n 2 > p.
9 Characteristic form Two sample T 2 test [( ) ] T 2 = (ȳ 1 ȳ 2 ) S pl (ȳ 1 ȳ 2 ) (3) n 1 n 2
10 Outline Two sample T 2 test 1 Two sample T 2 test 2
11 Two sample T 2 test What was all that stuff about likelihood ratio s about? It turns out that it is possible to show that: ( ) Λ 2/n ˆΣ = = (1 + T 2 ) 1 (4) ˆΣ 0 n 1 It is also possible to obtain the T 2 via union intersection methods. This is nice because it tells us a lot about the properties of the test!
12 Essentially, we wish to find a region of squared Mahalanobis distance such that: and we can find c 2 as follows: ( n 1 c 2 = n Pr ( (ȳ µ) S 1 (ȳ µ) ) c 2 )( p n p ) F (1 α),p,(n p) where F (1 α),p,(n p) is the (1 α) quantile of the F distribution with p and n p degrees of freedom, p represents the number of variables and n the sample size.
13 The centroid of the ellipse is at ȳ The half length of the semi-major axis is given by: λ1 p(n 1) n(n p) F p,n p(α) where λ 1 is the first eigenvalue of S The half length of the semi-minor axis is given by: λ2 p(n 1) n(n p) F p,n p(α) where λ 2 is the second eigenvalue of S The ratio of these two eigenvalues gives you some idea of the elongation of the ellipse
14
15 In addition to the (joint) confidence ellipse, it is possible to consider simultaneous confidence intervals - univariate confidence intervals based on a linear combination which could be considered as shadows of the confidence ellipse It is also possible to carry out Bonferroni adjustments of these simultaneous intervals
16 T 2 test is based upon Mahalanobis distance and can be used for inference on mean vectors - this test can be derived via a variety of routes Difference between univariate and multivariate inference, especially when considering confidence ellipses Having determined that there is a significant difference between mean vectors, you may wish to conduct a number of follow up investigations and even carry out discriminant analysis
Multivariate Statistical Analysis
Multivariate Statistical Analysis Fall 2011 C. L. Williams, Ph.D. Lecture 9 for Applied Multivariate Analysis Outline Addressing ourliers 1 Addressing ourliers 2 Outliers in Multivariate samples (1) For
More informationMultivariate Statistical Analysis
Multivariate Statistical Analysis Fall 2011 C. L. Williams, Ph.D. Lecture 17 for Applied Multivariate Analysis Outline Multivariate Analysis of Variance 1 Multivariate Analysis of Variance The hypotheses:
More informationInferences about a Mean Vector
Inferences about a Mean Vector Edps/Soc 584, Psych 594 Carolyn J. Anderson Department of Educational Psychology I L L I N O I S university of illinois at urbana-champaign c Board of Trustees, University
More informationLecture 3. Inference about multivariate normal distribution
Lecture 3. Inference about multivariate normal distribution 3.1 Point and Interval Estimation Let X 1,..., X n be i.i.d. N p (µ, Σ). We are interested in evaluation of the maximum likelihood estimates
More informationThe Bayes classifier
The Bayes classifier Consider where is a random vector in is a random variable (depending on ) Let be a classifier with probability of error/risk given by The Bayes classifier (denoted ) is the optimal
More informationLecture 6 Multiple Linear Regression, cont.
Lecture 6 Multiple Linear Regression, cont. BIOST 515 January 22, 2004 BIOST 515, Lecture 6 Testing general linear hypotheses Suppose we are interested in testing linear combinations of the regression
More informationLecture 5: Hypothesis tests for more than one sample
1/23 Lecture 5: Hypothesis tests for more than one sample Måns Thulin Department of Mathematics, Uppsala University thulin@math.uu.se Multivariate Methods 8/4 2011 2/23 Outline Paired comparisons Repeated
More informationSTAT 501 Assignment 2 NAME Spring Chapter 5, and Sections in Johnson & Wichern.
STAT 01 Assignment NAME Spring 00 Reading Assignment: Written Assignment: Chapter, and Sections 6.1-6.3 in Johnson & Wichern. Due Monday, February 1, in class. You should be able to do the first four problems
More informationMultivariate Capability Analysis Using Statgraphics. Presented by Dr. Neil W. Polhemus
Multivariate Capability Analysis Using Statgraphics Presented by Dr. Neil W. Polhemus Multivariate Capability Analysis Used to demonstrate conformance of a process to requirements or specifications that
More informationMean Vector Inferences
Mean Vector Inferences Lecture 5 September 21, 2005 Multivariate Analysis Lecture #5-9/21/2005 Slide 1 of 34 Today s Lecture Inferences about a Mean Vector (Chapter 5). Univariate versions of mean vector
More informationRejection regions for the bivariate case
Rejection regions for the bivariate case The rejection region for the T 2 test (and similarly for Z 2 when Σ is known) is the region outside of an ellipse, for which there is a (1-α)% chance that the test
More informationI L L I N O I S UNIVERSITY OF ILLINOIS AT URBANA-CHAMPAIGN
Comparisons of Two Means Edps/Soc 584 and Psych 594 Applied Multivariate Statistics Carolyn J. Anderson Department of Educational Psychology I L L I N O I S UNIVERSITY OF ILLINOIS AT URBANA-CHAMPAIGN c
More informationApplied Multivariate and Longitudinal Data Analysis
Applied Multivariate and Longitudinal Data Analysis Chapter 2: Inference about the mean vector(s) Ana-Maria Staicu SAS Hall 5220; 919-515-0644; astaicu@ncsu.edu 1 In this chapter we will discuss inference
More informationThe linear model is the most fundamental of all serious statistical models encompassing:
Linear Regression Models: A Bayesian perspective Ingredients of a linear model include an n 1 response vector y = (y 1,..., y n ) T and an n p design matrix (e.g. including regressors) X = [x 1,..., x
More informationF & B Approaches to a simple model
A6523 Signal Modeling, Statistical Inference and Data Mining in Astrophysics Spring 215 http://www.astro.cornell.edu/~cordes/a6523 Lecture 11 Applications: Model comparison Challenges in large-scale surveys
More informationSimple Linear Regression
Simple Linear Regression In simple linear regression we are concerned about the relationship between two variables, X and Y. There are two components to such a relationship. 1. The strength of the relationship.
More informationBayesian Linear Regression
Bayesian Linear Regression Sudipto Banerjee 1 Biostatistics, School of Public Health, University of Minnesota, Minneapolis, Minnesota, U.S.A. September 15, 2010 1 Linear regression models: a Bayesian perspective
More informationMultiple Linear Regression
Multiple Linear Regression Simple linear regression tries to fit a simple line between two variables Y and X. If X is linearly related to Y this explains some of the variability in Y. In most cases, there
More informationProblems. Suppose both models are fitted to the same data. Show that SS Res, A SS Res, B
Simple Linear Regression 35 Problems 1 Consider a set of data (x i, y i ), i =1, 2,,n, and the following two regression models: y i = β 0 + β 1 x i + ε, (i =1, 2,,n), Model A y i = γ 0 + γ 1 x i + γ 2
More informationMATH5745 Multivariate Methods Lecture 07
MATH5745 Multivariate Methods Lecture 07 Tests of hypothesis on covariance matrix March 16, 2018 MATH5745 Multivariate Methods Lecture 07 March 16, 2018 1 / 39 Test on covariance matrices: Introduction
More informationSTT 843 Key to Homework 1 Spring 2018
STT 843 Key to Homework Spring 208 Due date: Feb 4, 208 42 (a Because σ = 2, σ 22 = and ρ 2 = 05, we have σ 2 = ρ 2 σ σ22 = 2/2 Then, the mean and covariance of the bivariate normal is µ = ( 0 2 and Σ
More informationMultivariate Statistical Analysis
Multivariate Statistical Analysis Fall 2011 C. L. Williams, Ph.D. Lecture 4 for Applied Multivariate Analysis Outline 1 Eigen values and eigen vectors Characteristic equation Some properties of eigendecompositions
More informationStat 5101 Lecture Notes
Stat 5101 Lecture Notes Charles J. Geyer Copyright 1998, 1999, 2000, 2001 by Charles J. Geyer May 7, 2001 ii Stat 5101 (Geyer) Course Notes Contents 1 Random Variables and Change of Variables 1 1.1 Random
More informationPhysics 403. Segev BenZvi. Parameter Estimation, Correlations, and Error Bars. Department of Physics and Astronomy University of Rochester
Physics 403 Parameter Estimation, Correlations, and Error Bars Segev BenZvi Department of Physics and Astronomy University of Rochester Table of Contents 1 Review of Last Class Best Estimates and Reliability
More information6 Multivariate Regression
6 Multivariate Regression 6.1 The Model a In multiple linear regression, we study the relationship between several input variables or regressors and a continuous target variable. Here, several target variables
More informationMISCELLANEOUS TOPICS RELATED TO LIKELIHOOD. Copyright c 2012 (Iowa State University) Statistics / 30
MISCELLANEOUS TOPICS RELATED TO LIKELIHOOD Copyright c 2012 (Iowa State University) Statistics 511 1 / 30 INFORMATION CRITERIA Akaike s Information criterion is given by AIC = 2l(ˆθ) + 2k, where l(ˆθ)
More informationNotes on the Multivariate Normal and Related Topics
Version: July 10, 2013 Notes on the Multivariate Normal and Related Topics Let me refresh your memory about the distinctions between population and sample; parameters and statistics; population distributions
More informationPrincipal component analysis
Principal component analysis Motivation i for PCA came from major-axis regression. Strong assumption: single homogeneous sample. Free of assumptions when used for exploration. Classical tests of significance
More informationStatistics. Lent Term 2015 Prof. Mark Thomson. 2: The Gaussian Limit
Statistics Lent Term 2015 Prof. Mark Thomson Lecture 2 : The Gaussian Limit Prof. M.A. Thomson Lent Term 2015 29 Lecture Lecture Lecture Lecture 1: Back to basics Introduction, Probability distribution
More informationMachine Learning (CS 567) Lecture 5
Machine Learning (CS 567) Lecture 5 Time: T-Th 5:00pm - 6:20pm Location: GFS 118 Instructor: Sofus A. Macskassy (macskass@usc.edu) Office: SAL 216 Office hours: by appointment Teaching assistant: Cheol
More informationy ˆ i = ˆ " T u i ( i th fitted value or i th fit)
1 2 INFERENCE FOR MULTIPLE LINEAR REGRESSION Recall Terminology: p predictors x 1, x 2,, x p Some might be indicator variables for categorical variables) k-1 non-constant terms u 1, u 2,, u k-1 Each u
More informationIntroduction to Simple Linear Regression
Introduction to Simple Linear Regression Yang Feng http://www.stat.columbia.edu/~yangfeng Yang Feng (Columbia University) Introduction to Simple Linear Regression 1 / 68 About me Faculty in the Department
More informationSampling Distributions
Merlise Clyde Duke University September 8, 2016 Outline Topics Normal Theory Chi-squared Distributions Student t Distributions Readings: Christensen Apendix C, Chapter 1-2 Prostate Example > library(lasso2);
More informationSTA 437: Applied Multivariate Statistics
Al Nosedal. University of Toronto. Winter 2015 1 Chapter 5. Tests on One or Two Mean Vectors If you can t explain it simply, you don t understand it well enough Albert Einstein. Definition Chapter 5. Tests
More informationStatistical Inference On the High-dimensional Gaussian Covarianc
Statistical Inference On the High-dimensional Gaussian Covariance Matrix Department of Mathematical Sciences, Clemson University June 6, 2011 Outline Introduction Problem Setup Statistical Inference High-Dimensional
More information1 Statistical inference for a population mean
1 Statistical inference for a population mean 1. Inference for a large sample, known variance Suppose X 1,..., X n represents a large random sample of data from a population with unknown mean µ and known
More informationTHE UNIVERSITY OF CHICAGO Booth School of Business Business 41912, Spring Quarter 2016, Mr. Ruey S. Tsay
THE UNIVERSITY OF CHICAGO Booth School of Business Business 41912, Spring Quarter 2016, Mr. Ruey S. Tsay Lecture 5: Multivariate Multiple Linear Regression The model is Y n m = Z n (r+1) β (r+1) m + ɛ
More informationLinear Methods for Prediction
Chapter 5 Linear Methods for Prediction 5.1 Introduction We now revisit the classification problem and focus on linear methods. Since our prediction Ĝ(x) will always take values in the discrete set G we
More informationST505/S697R: Fall Homework 2 Solution.
ST505/S69R: Fall 2012. Homework 2 Solution. 1. 1a; problem 1.22 Below is the summary information (edited) from the regression (using R output); code at end of solution as is code and output for SAS. a)
More informationThis paper is not to be removed from the Examination Halls
~~ST104B ZA d0 This paper is not to be removed from the Examination Halls UNIVERSITY OF LONDON ST104B ZB BSc degrees and Diplomas for Graduates in Economics, Management, Finance and the Social Sciences,
More informationStatistics - Lecture One. Outline. Charlotte Wickham 1. Basic ideas about estimation
Statistics - Lecture One Charlotte Wickham wickham@stat.berkeley.edu http://www.stat.berkeley.edu/~wickham/ Outline 1. Basic ideas about estimation 2. Method of Moments 3. Maximum Likelihood 4. Confidence
More informationApplied Regression. Applied Regression. Chapter 2 Simple Linear Regression. Hongcheng Li. April, 6, 2013
Applied Regression Chapter 2 Simple Linear Regression Hongcheng Li April, 6, 2013 Outline 1 Introduction of simple linear regression 2 Scatter plot 3 Simple linear regression model 4 Test of Hypothesis
More informationSTA 2201/442 Assignment 2
STA 2201/442 Assignment 2 1. This is about how to simulate from a continuous univariate distribution. Let the random variable X have a continuous distribution with density f X (x) and cumulative distribution
More informationMa 3/103: Lecture 24 Linear Regression I: Estimation
Ma 3/103: Lecture 24 Linear Regression I: Estimation March 3, 2017 KC Border Linear Regression I March 3, 2017 1 / 32 Regression analysis Regression analysis Estimate and test E(Y X) = f (X). f is the
More informationLeast Squares Estimation
Least Squares Estimation Using the least squares estimator for β we can obtain predicted values and compute residuals: Ŷ = Z ˆβ = Z(Z Z) 1 Z Y ˆɛ = Y Ŷ = Y Z(Z Z) 1 Z Y = [I Z(Z Z) 1 Z ]Y. The usual decomposition
More informationTopic 22 Analysis of Variance
Topic 22 Analysis of Variance Comparing Multiple Populations 1 / 14 Outline Overview One Way Analysis of Variance Sample Means Sums of Squares The F Statistic Confidence Intervals 2 / 14 Overview Two-sample
More informationAssociation studies and regression
Association studies and regression CM226: Machine Learning for Bioinformatics. Fall 2016 Sriram Sankararaman Acknowledgments: Fei Sha, Ameet Talwalkar Association studies and regression 1 / 104 Administration
More informationSIMULTANEOUS CONFIDENCE INTERVALS AMONG k MEAN VECTORS IN REPEATED MEASURES WITH MISSING DATA
SIMULTANEOUS CONFIDENCE INTERVALS AMONG k MEAN VECTORS IN REPEATED MEASURES WITH MISSING DATA Kazuyuki Koizumi Department of Mathematics, Graduate School of Science Tokyo University of Science 1-3, Kagurazaka,
More informationLecture 9: Classification, LDA
Lecture 9: Classification, LDA Reading: Chapter 4 STATS 202: Data mining and analysis October 13, 2017 1 / 21 Review: Main strategy in Chapter 4 Find an estimate ˆP (Y X). Then, given an input x 0, we
More informationToday we will prove one result from probability that will be useful in several statistical tests. ... B1 B2 Br. Figure 23.1:
Lecture 23 23. Pearson s theorem. Today we will prove one result from probability that will be useful in several statistical tests. Let us consider r boxes B,..., B r as in figure 23.... B B2 Br Figure
More informationStatistical Models. ref: chapter 1 of Bates, D and D. Watts (1988) Nonlinear Regression Analysis and its Applications, Wiley. Dave Campbell 2009
Statistical Models ref: chapter 1 of Bates, D and D. Watts (1988) Nonlinear Regression Analysis and its Applications, Wiley Dave Campbell 2009 Today linear regression in terms of the response surface geometry
More informationLecture 9: Classification, LDA
Lecture 9: Classification, LDA Reading: Chapter 4 STATS 202: Data mining and analysis October 13, 2017 1 / 21 Review: Main strategy in Chapter 4 Find an estimate ˆP (Y X). Then, given an input x 0, we
More informationSimple Linear Regression
Simple Linear Regression ST 430/514 Recall: A regression model describes how a dependent variable (or response) Y is affected, on average, by one or more independent variables (or factors, or covariates)
More informationBayesian Linear Models
Bayesian Linear Models Sudipto Banerjee 1 and Andrew O. Finley 2 1 Department of Forestry & Department of Geography, Michigan State University, Lansing Michigan, U.S.A. 2 Biostatistics, School of Public
More informationTAMS39 Lecture 2 Multivariate normal distribution
TAMS39 Lecture 2 Multivariate normal distribution Martin Singull Department of Mathematics Mathematical Statistics Linköping University, Sweden Content Lecture Random vectors Multivariate normal distribution
More informationLinear Regression. In this problem sheet, we consider the problem of linear regression with p predictors and one intercept,
Linear Regression In this problem sheet, we consider the problem of linear regression with p predictors and one intercept, y = Xβ + ɛ, where y t = (y 1,..., y n ) is the column vector of target values,
More informationMULTIVARIATE POPULATIONS
CHAPTER 5 MULTIVARIATE POPULATIONS 5. INTRODUCTION In the following chapters we will be dealing with a variety of problems concerning multivariate populations. The purpose of this chapter is to provide
More information01 Probability Theory and Statistics Review
NAVARCH/EECS 568, ROB 530 - Winter 2018 01 Probability Theory and Statistics Review Maani Ghaffari January 08, 2018 Last Time: Bayes Filters Given: Stream of observations z 1:t and action data u 1:t Sensor/measurement
More informationLecture 5. Gaussian Models - Part 1. Luigi Freda. ALCOR Lab DIAG University of Rome La Sapienza. November 29, 2016
Lecture 5 Gaussian Models - Part 1 Luigi Freda ALCOR Lab DIAG University of Rome La Sapienza November 29, 2016 Luigi Freda ( La Sapienza University) Lecture 5 November 29, 2016 1 / 42 Outline 1 Basics
More informationMultivariate Distributions
Copyright Cosma Rohilla Shalizi; do not distribute without permission updates at http://www.stat.cmu.edu/~cshalizi/adafaepov/ Appendix E Multivariate Distributions E.1 Review of Definitions Let s review
More informationCh 2: Simple Linear Regression
Ch 2: Simple Linear Regression 1. Simple Linear Regression Model A simple regression model with a single regressor x is y = β 0 + β 1 x + ɛ, where we assume that the error ɛ is independent random component
More informationOverview of Extreme Value Theory. Dr. Sawsan Hilal space
Overview of Extreme Value Theory Dr. Sawsan Hilal space Maths Department - University of Bahrain space November 2010 Outline Part-1: Univariate Extremes Motivation Threshold Exceedances Part-2: Bivariate
More informationBayesian Decision and Bayesian Learning
Bayesian Decision and Bayesian Learning Ying Wu Electrical Engineering and Computer Science Northwestern University Evanston, IL 60208 http://www.eecs.northwestern.edu/~yingwu 1 / 30 Bayes Rule p(x ω i
More informationMultivariate Bayesian Linear Regression MLAI Lecture 11
Multivariate Bayesian Linear Regression MLAI Lecture 11 Neil D. Lawrence Department of Computer Science Sheffield University 21st October 2012 Outline Univariate Bayesian Linear Regression Multivariate
More informationMultivariate Linear Regression Models
Multivariate Linear Regression Models Regression analysis is used to predict the value of one or more responses from a set of predictors. It can also be used to estimate the linear association between
More informationMultivariate Statistics
Multivariate Statistics Chapter 2: Multivariate distributions and inference Pedro Galeano Departamento de Estadística Universidad Carlos III de Madrid pedro.galeano@uc3m.es Course 2016/2017 Master in Mathematical
More informationUniversity of Cambridge Engineering Part IIB Module 4F10: Statistical Pattern Processing Handout 2: Multivariate Gaussians
University of Cambridge Engineering Part IIB Module 4F: Statistical Pattern Processing Handout 2: Multivariate Gaussians.2.5..5 8 6 4 2 2 4 6 8 Mark Gales mjfg@eng.cam.ac.uk Michaelmas 2 2 Engineering
More informationBayesian Linear Models
Bayesian Linear Models Sudipto Banerjee 1 and Andrew O. Finley 2 1 Biostatistics, School of Public Health, University of Minnesota, Minneapolis, Minnesota, U.S.A. 2 Department of Forestry & Department
More informationSimple Linear Regression
Simple Linear Regression MATH 282A Introduction to Computational Statistics University of California, San Diego Instructor: Ery Arias-Castro http://math.ucsd.edu/ eariasca/math282a.html MATH 282A University
More informationStat 206: Estimation and testing for a mean vector,
Stat 206: Estimation and testing for a mean vector, Part II James Johndrow 2016-12-03 Comparing components of the mean vector In the last part, we talked about testing the hypothesis H 0 : µ 1 = µ 2 where
More informationPart IB Statistics. Theorems with proof. Based on lectures by D. Spiegelhalter Notes taken by Dexter Chua. Lent 2015
Part IB Statistics Theorems with proof Based on lectures by D. Spiegelhalter Notes taken by Dexter Chua Lent 2015 These notes are not endorsed by the lecturers, and I have modified them (often significantly)
More informationLectures 5 & 6: Hypothesis Testing
Lectures 5 & 6: Hypothesis Testing in which you learn to apply the concept of statistical significance to OLS estimates, learn the concept of t values, how to use them in regression work and come across
More information1. Density and properties Brief outline 2. Sampling from multivariate normal and MLE 3. Sampling distribution and large sample behavior of X and S 4.
Multivariate normal distribution Reading: AMSA: pages 149-200 Multivariate Analysis, Spring 2016 Institute of Statistics, National Chiao Tung University March 1, 2016 1. Density and properties Brief outline
More informationPROBABILITY DISTRIBUTIONS. J. Elder CSE 6390/PSYC 6225 Computational Modeling of Visual Perception
PROBABILITY DISTRIBUTIONS Credits 2 These slides were sourced and/or modified from: Christopher Bishop, Microsoft UK Parametric Distributions 3 Basic building blocks: Need to determine given Representation:
More informationUniversity of Cambridge Engineering Part IIB Module 4F10: Statistical Pattern Processing Handout 2: Multivariate Gaussians
Engineering Part IIB: Module F Statistical Pattern Processing University of Cambridge Engineering Part IIB Module F: Statistical Pattern Processing Handout : Multivariate Gaussians. Generative Model Decision
More informationYou can compute the maximum likelihood estimate for the correlation
Stat 50 Solutions Comments on Assignment Spring 005. (a) _ 37.6 X = 6.5 5.8 97.84 Σ = 9.70 4.9 9.70 75.05 7.80 4.9 7.80 4.96 (b) 08.7 0 S = Σ = 03 9 6.58 03 305.6 30.89 6.58 30.89 5.5 (c) You can compute
More informationMonte Carlo Studies. The response in a Monte Carlo study is a random variable.
Monte Carlo Studies The response in a Monte Carlo study is a random variable. The response in a Monte Carlo study has a variance that comes from the variance of the stochastic elements in the data-generating
More informationMultivariate Gaussian Analysis
BS2 Statistical Inference, Lecture 7, Hilary Term 2009 February 13, 2009 Marginal and conditional distributions For a positive definite covariance matrix Σ, the multivariate Gaussian distribution has density
More informationExam 2. Jeremy Morris. March 23, 2006
Exam Jeremy Morris March 3, 006 4. Consider a bivariate normal population with µ 0, µ, σ, σ and ρ.5. a Write out the bivariate normal density. The multivariate normal density is defined by the following
More informationPart 6: Multivariate Normal and Linear Models
Part 6: Multivariate Normal and Linear Models 1 Multiple measurements Up until now all of our statistical models have been univariate models models for a single measurement on each member of a sample of
More informationLinear models and their mathematical foundations: Simple linear regression
Linear models and their mathematical foundations: Simple linear regression Steffen Unkel Department of Medical Statistics University Medical Center Göttingen, Germany Winter term 2018/19 1/21 Introduction
More informationLecture 15. Hypothesis testing in the linear model
14. Lecture 15. Hypothesis testing in the linear model Lecture 15. Hypothesis testing in the linear model 1 (1 1) Preliminary lemma 15. Hypothesis testing in the linear model 15.1. Preliminary lemma Lemma
More informationProfile Analysis Multivariate Regression
Lecture 8 October 12, 2005 Analysis Lecture #8-10/12/2005 Slide 1 of 68 Today s Lecture Profile analysis Today s Lecture Schedule : regression review multiple regression is due Thursday, October 27th,
More informationCh 3: Multiple Linear Regression
Ch 3: Multiple Linear Regression 1. Multiple Linear Regression Model Multiple regression model has more than one regressor. For example, we have one response variable and two regressor variables: 1. delivery
More informationExample 1 describes the results from analyzing these data for three groups and two variables contained in test file manova1.tf3.
Simfit Tutorials and worked examples for simulation, curve fitting, statistical analysis, and plotting. http://www.simfit.org.uk MANOVA examples From the main SimFIT menu choose [Statistcs], [Multivariate],
More informationReview Quiz. 1. Prove that in a one-dimensional canonical exponential family, the complete and sufficient statistic achieves the
Review Quiz 1. Prove that in a one-dimensional canonical exponential family, the complete and sufficient statistic achieves the Cramér Rao lower bound (CRLB). That is, if where { } and are scalars, then
More informationFormal Statement of Simple Linear Regression Model
Formal Statement of Simple Linear Regression Model Y i = β 0 + β 1 X i + ɛ i Y i value of the response variable in the i th trial β 0 and β 1 are parameters X i is a known constant, the value of the predictor
More informationChapter 7, continued: MANOVA
Chapter 7, continued: MANOVA The Multivariate Analysis of Variance (MANOVA) technique extends Hotelling T 2 test that compares two mean vectors to the setting in which there are m 2 groups. We wish to
More informationMethods for Identifying Out-of-Trend Data in Analysis of Stability Measurements Part II: By-Time-Point and Multivariate Control Chart
Peer-Reviewed Methods for Identifying Out-of-Trend Data in Analysis of Stability Measurements Part II: By-Time-Point and Multivariate Control Chart Máté Mihalovits and Sándor Kemény T his article is a
More information5 Inferences about a Mean Vector
5 Inferences about a Mean Vector In this chapter we use the results from Chapter 2 through Chapter 4 to develop techniques for analyzing data. A large part of any analysis is concerned with inference that
More informationL03. PROBABILITY REVIEW II COVARIANCE PROJECTION. NA568 Mobile Robotics: Methods & Algorithms
L03. PROBABILITY REVIEW II COVARIANCE PROJECTION NA568 Mobile Robotics: Methods & Algorithms Today s Agenda State Representation and Uncertainty Multivariate Gaussian Covariance Projection Probabilistic
More informationIntroduction to Empirical Processes and Semiparametric Inference Lecture 02: Overview Continued
Introduction to Empirical Processes and Semiparametric Inference Lecture 02: Overview Continued Michael R. Kosorok, Ph.D. Professor and Chair of Biostatistics Professor of Statistics and Operations Research
More informationAnalysis of Variance (ANOVA)
Analysis of Variance (ANOVA) Much of statistical inference centers around the ability to distinguish between two or more groups in terms of some underlying response variable y. Sometimes, there are but
More informationCHAPTER 5. Outlier Detection in Multivariate Data
CHAPTER 5 Outlier Detection in Multivariate Data 5.1 Introduction Multivariate outlier detection is the important task of statistical analysis of multivariate data. Many methods have been proposed for
More informationME 597: AUTONOMOUS MOBILE ROBOTICS SECTION 2 PROBABILITY. Prof. Steven Waslander
ME 597: AUTONOMOUS MOBILE ROBOTICS SECTION 2 Prof. Steven Waslander p(a): Probability that A is true 0 pa ( ) 1 p( True) 1, p( False) 0 p( A B) p( A) p( B) p( A B) A A B B 2 Discrete Random Variable X
More informationThe Components of a Statistical Hypothesis Testing Problem
Statistical Inference: Recall from chapter 5 that statistical inference is the use of a subset of a population (the sample) to draw conclusions about the entire population. In chapter 5 we studied one
More information6-1. Canonical Correlation Analysis
6-1. Canonical Correlation Analysis Canonical Correlatin analysis focuses on the correlation between a linear combination of the variable in one set and a linear combination of the variables in another
More informationLinear Methods for Prediction
This work is licensed under a Creative Commons Attribution-NonCommercial-ShareAlike License. Your use of this material constitutes acceptance of that license and the conditions of use of materials on this
More informationLecture 8: Classification
1/26 Lecture 8: Classification Måns Eriksson Department of Mathematics, Uppsala University eriksson@math.uu.se Multivariate Methods 19/5 2010 Classification: introductory examples Goal: Classify an observation
More informationAnalysis of variance, multivariate (MANOVA)
Analysis of variance, multivariate (MANOVA) Abstract: A designed experiment is set up in which the system studied is under the control of an investigator. The individuals, the treatments, the variables
More information